A Campbell diagram plot represents a system's response spectrum as a function of its oscillation regime. It is named for Wilfred Campbell, who has introduced the concept, see Campbell 1924[1].

In rotordynamics

File:Campbelldiagram.png
Analytical Campbell Diagram for a Simple Rotor

In rotordynamical systems, the eigenfrequencies often depend on the rotation rates due to the induced gyroscopic effects or variable hydrodynamic conditions in fluid bearings. It might represent the following cases:

1. Analytically computed values of eigenfrequencies as a function of the shaft's rotation speed. This case is also called "whirl speed map", see Logan 2003. Such chart can be used in turbine design as shown in the numerically calculated Campbell Diagram example illustrated by the image: analysis shows that there are well-damped critical speed at lower speed range. Another critical speed at mode 4 is observed at 7810 rpm (130 Hz) in dangerous vicinity of nominal shaft speed, but it has 30% damping - enough to safely ignore it.

File:Campbell Diagram.png
Campbell Diagram of a steam turbine

2. Experimentally measured vibration response spectrum as a function of the shaft's rotation speed (waterfall plot), the peak locations for each slice usually corresponding to the eigenfrequencies.

In acoustical engineering

In acoustical engineering, the Campbell diagram would represent the pressure spectrum waterfall plot vs the machine's shaft rotation speed (sometimes also called 3D noise map).

Notes

  1. cited after Meher-Homji 2005

External links

References

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